The impulsive solution for a semi-linear singularly perturbed differential-difference equation
DOI10.1007/s10255-016-0557-xzbMath1342.34099OpenAlexW2345192477WikidataQ115384955 ScholiaQ115384955MaRDI QIDQ287866
Mei Xu, Ai-feng Wang, Ming Kang Ni
Publication date: 23 May 2016
Published in: Acta Mathematicae Applicatae Sinica. English Series (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s10255-016-0557-x
asymptotic expansiondelay argumentboundary functionsingularly perturbeddifferential-difference equationimpulsive solution
Stability theory of functional-differential equations (34K20) Asymptotic expansions of solutions to ordinary differential equations (34E05) Singular perturbations of functional-differential equations (34K26)
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Cites Work
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- Numerical analysis of singularly perturbed delay differential turning point problem
- Exponential methods for singularly perturbed ordinary differential-difference equations
- A solution of the discrepancy occurs due to using the fitted mesh approach rather than to the fitted operator for solving singularly perturbed differential equations
- Numerical treatment for singularly perturbed nonlinear differential difference equations with negative shift
- Asymptotic expansion for the solution of singularly perturbed delay differential equations
- Numerical analysis of singularly perturbed delay differential equations with layer behavior
- Fitted mesh \(B\)-spline collocation method for singularly perturbed differential-difference equations with small delay
- A numerical method based on finite difference for boundary value problems for singularly perturbed delay differential equations
- Parameter uniform numerical method for a boundary-value problem for singularly perturbed nonlinear delay differential equation of neutral type
- Uniformly convergent non-standard finite difference methods for singularly perturbed differential-difference equations with delay and advance
- Singular Perturbation Analysis of Boundary Value Problems for Differential-Difference Equations. V. Small Shifts with Layer Behavior
- Singular Perturbation Analysis of Boundary Value Problems for Differential‐Difference Equations. IV. A Nonlinear Example with Layer Behavior
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